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Then it is important that I satisfy myself in women's.
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Remark 2.2 Assume that I satisfies the ( C ) c ∗ condition.
We now show that there exist constants (rho>0) and (alpha>0) such that I satisfies condition (A1) of Lemma 2.6.
We now prove that I satisfies the ( P S ) -condition.
Lemma 2.3 implies that I satisfies the (PS) condition.
Finally, we prove that I satisfies the (C) condition.
First, we show that I satisfies the P.S. condition.
Next we prove that I satisfies ((C _{c}).
(2.1) Moreover, assume that I satisfies ({(C ^{[mu]}} -condition.
Finally, we check that I satisfies the (PS) condition.
First, we prove that I satisfies ( I 1 ) and ( I 2 ) of Lemma 2.2.
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